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Warm up #3 3/24 – even 3/27 - odd The following table shows the number of people that like a particular fast food restaurant. 1. What is the probability that a person likes Wendy’s? Mc. D’s BK Wendy’s Male 20 15 10 Female 20 10 25 7/20 2. What is the probability that a person is male given they like BK? 3/5 3. What is the probability that a person is male and likes BK? 3/20 4. What is the probability that a randomly chosen person is female or likes Mc. Donald’s? 3/4

USA Test Prep 10 Problems due by Monday!!!

Answers to HW

Skills Check Vocabulary Check!!! 10 minutes

Probability Independent and Dependent Events

Independent Events A occurring does NOT affect the probability of B occurring. “AND” means to MULTIPLY!

Independent Event FORMULA P(A and B) = P(A) P(B) also known as P(A B) = P(A) P(B)

Example 1 A coin is tossed and a 6 -sided die is rolled. Find the probability of landing on the head side of the coin and rolling a 3 on the die. P(Head and 3) P(A B) = P(A) P(B)

Example 2 A card is chosen at random from a deck of 52 cards. It is then replaced and a second card is chosen. What is the probability of choosing a jack and an eight? P(Jack and 8) P(A B) = P(A) P(B)

Example 3 A jar contains 3 red, 5 green, 2 blue and 6 yellow marbles. A marble is chosen at random from the jar. After replacing it, a second marble is chosen. What is the probability of choosing a green and a yellow marble? P(Green and Yellow) P(A B) = P(A) P(B)

Example 4 A school survey found that 9 out of 10 students like pizza. If three students are chosen at random with replacement, what is the probability that all three students like pizza? P(Like and Like)

Dependent Events A occurring AFFECTS the probability of B occurring Usually you will see the words “without replacing” “AND” still means to MULTIPLY!

Dependent Event Formula P(A and B) = P(A) P(B given A) also known as P(A B) = P(A) P(B|A)

Example 5 A jar contains 3 red, 5 green, 2 blue and 6 yellow marbles. A marble is chosen at random from the jar. A second marble is chosen without replacing the first one. What is the probability of choosing a green and a yellow marble? P(Green and Yellow) P(A B) = P(A) P(B|A)

Example 6 An aquarium contains 6 male goldfish and 4 female goldfish. You randomly select a fish from the tank, do not replace it, and then randomly select a second fish. What is the probability that both fish are male? P(Male and Male) P(A B) = P(A) P(B|A)

Example 7 A random sample of parts coming off a machine is done by an inspector. He found that 5 out of 100 parts are bad on average. If he were to do a new sample, what is the probability that he picks a bad part and then, picks another bad part if he doesn’t replace the first? P(Bad and Bad) P(A B) = P(A) P(B|A)

Determining if 2 Events are Independent

Determining if Events are Independent 3 Ways to check. We are going to practice one of the ways: P(A B) = P(A) P(B) Substitute in what you know and check to see if left side equals right side.

Example 8 Let event M = taking a math class. Let event S = taking a science class. Then, M and S = taking a math class and a science class. Suppose P(M) = 0. 6, P(S) = 0. 5, and P(M and S) = 0. 3. Are M and S independent? Conclusion: Taking a math class and taking a science class are independent of each other.

Example 9 In a particular college class, 60% of the students are female. 50% of all students in the class have long hair. 45% of the students are female and have long hair. Of the female students, 75% have long hair. Let F be the event that the student is female. Let L be the event that the student has long hair. One student is picked randomly. Are the events of being female and having long hair independent? Conclusion: Being a female and having long hair are not independent.

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